On maldistributed sequences and meager ideals

Abstract

We show that an ideal I on ω is meager if and only if the set of sequences (xn) taking values in a Polish space X for which all elements of X are I-cluster points of (xn) is comeager. The latter condition is also known as -maldistribution, where : P(ω) R is the \0,1\-valued submeasure defined by (A)=1 if and only if A I. It turns out that the meagerness of I is also equivalent to a technical condition given by Misik and Toth in [J. Math. Anal. Appl. 541 (2025), 128667]. Lastly, we show that the analogue of the first part holds replacing with \|·\|, where is a lower semicontinuous submeasure.